Bialgebra

Idea

A bialgebra (or bigebra) is both an algebra and a coalgebra, where the operations of either one are homomorphisms for the other. A bialgebra structure on an associative algebra is precisely such as to make its category of modules into a monoidal category equipped with a fiber functor.

A bialgebra is one of the ingredients in the concept of Hopf algebra.

Definition

A bialgebra is a monoid in the category of coalgebras. Equivalently, it is a comonoid in the category of algebras. Equivalently, it is a monoid in the category of comonoids in Vect — or equivalently, a comonoid in the category of monoids in Vect.

More generally, a bimonoid in a monoidal category $M$ is a monoid in the category of comonoids in $M$ — or equivalently, a comonoid in the category of monoids in $M$. So, a bialgebra is a bimonoid in $Vect$.

Properties

Relation to sesquialgebras

Bialgebras are precisely those sesquialgebras $A$ whose product $A \otimes A$-$A$-bimodule is induced from an algebra homomorphism $A \to A \otimes A$ and whose unit $k$-$A$ bimodule is induced from an algebra homomorphism $A \to k$.

Tannaka duality and categories of modules

The structure of a bialgebra on an associative algebra equips its category of modules with the structure of a monoidal category and a monoidal fiber functor. In fact that construction is an equivalence. This is the statement of Tannaka duality for bialgebras. For instance (Bakke)

Examples

Notions of bialgebra with further structure notably include Hopf algebras and their variants.

Related concepts

• bimonoid

• Gerstenhaber-Schack cohomology, bialgebra cocycle, weak bialgebra, bialgebroid

• Hopf algebra

• quasitriangular bialgebra

• sesquialgebra

• algebra, module

• bialgebra, 2-module

• trialgebra, 3-module

References

Tannaka duality for bialgebras

• Tørris Koløen Bakke, Hopf algebras and monoidal categories (2007) (pdf)

On bialgebras in locally presentable categories:

• Friedrich Ulmer. Bialgebras in locally presentable categories, University of Wuppertal preprint (1977) [pdf]